Factorise: A2 - 0·36 B2

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Factorise: a² - 0·36 b²

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उत्तर

a² - 0·36 b²

= (a)² - (0.6b)²

= (a + 0.6b)(a - 0.6b) ...[a² - b² = (a + b)(a - b)]

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Factorisation by Taking Out Common Factors

या प्रश्नात किंवा उत्तरात काही त्रुटी आहे का?

Q 8.3 Q 8.2 Q 8.4

पाठ 13: Factorisation - Exercise 13 (F) [पृष्ठ १६३]

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सेलिना Concise Mathematics [English] Class 8 ICSE

पाठ 13 Factorisation
Exercise 13 (F) | Q 8.3 | पृष्ठ १६३

संबंधित प्रश्‍न

Find the common factors of the terms.

2x, 3x², 4

Factorize the following:
20a¹²b² − 15a⁸b⁴

Factorize the following:
x⁴y² − x²y⁴ − x⁴y⁴

Factorize the following:
x²yz + xy²z + xyz²

Factories by taking out common factors :
2x(a - b) + 3y(5a - 5b) + 4z(2b - 2a)

Factorise : 4(2x - 3y)² - 8x+12y - 3

Find the value of : `[(6.7)^2 - (3.3)^2]/[6.7 - 3.3]`

Factorise : 3x⁵y - 27x⁴y² + 12x³y³

Factorise: 6xy(a² + b²) + 8yz(a² + b²) −10xz(a² + b²)

factorise : 35a³b²c + 42ab²c²

Factorise: 36x²y² - 30x³y³ + 48x³y²

factorise : x²y - xy² + 5x - 5y

Factorise:

a² – ab(1 – b) – b³

factorise : m - 1 - (m-1)² + am - a

Factorise xy² - xz², Hence, find the value of :

9 x 8² - 9 x 2²

Factorise the following by taking out the common factors:
4x²y³ - 6x³y² - 12xy²

Factorise the following by taking out the common factors:
12a³+ 15a²b - 21ab²

Factorise the following by taking out the common factors:
(a - b)² -2(a - b)

Factorise:
4x⁴ + 25y⁴ + 19x²y²

Factorise: A2 - 0·36 B2

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Factorise: A2 - 0·36 B2

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